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Non-perturbative renormalization of lattice QCD at all scales
A general strategy to solve the non-perturbative renormalization problem in lattice QCD, using finite-size techniques and numerical simulations, is described. As an illustration we discuss the computation of the axial current normalization constant, the running coupling at zero quark masses and the...
| Autores principales: | , , , , , , , |
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| Lenguaje: | eng |
| Publicado: |
1995
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| Materias: | |
| Acceso en línea: | https://dx.doi.org/10.1016/0370-2693(96)00075-5 http://cds.cern.ch/record/292554 |
| _version_ | 1780888743927873536 |
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| author | Jansen, Karl Liu, Chuan Luscher, Martin Simma, Hubert Sint, Stefan Sommer, Rainer Weisz, Peter Wolff, Ulli |
| author_facet | Jansen, Karl Liu, Chuan Luscher, Martin Simma, Hubert Sint, Stefan Sommer, Rainer Weisz, Peter Wolff, Ulli |
| author_sort | Jansen, Karl |
| collection | CERN |
| description | A general strategy to solve the non-perturbative renormalization problem in lattice QCD, using finite-size techniques and numerical simulations, is described. As an illustration we discuss the computation of the axial current normalization constant, the running coupling at zero quark masses and the scale evolution of the renormalized axial density. The non-perturbative calculation of O(a) correction terms (as they appear in Symanzik's improvement programme) is another important field of application. |
| id | cern-292554 |
| institution | Organización Europea para la Investigación Nuclear |
| language | eng |
| publishDate | 1995 |
| record_format | invenio |
| spelling | cern-2925542021-09-17T02:38:11Zdoi:10.1016/0370-2693(96)00075-5http://cds.cern.ch/record/292554engJansen, KarlLiu, ChuanLuscher, MartinSimma, HubertSint, StefanSommer, RainerWeisz, PeterWolff, UlliNon-perturbative renormalization of lattice QCD at all scalesParticle Physics - LatticeA general strategy to solve the non-perturbative renormalization problem in lattice QCD, using finite-size techniques and numerical simulations, is described. As an illustration we discuss the computation of the axial current normalization constant, the running coupling at zero quark masses and the scale evolution of the renormalized axial density. The non-perturbative calculation of O(a) correction terms (as they appear in Symanzik's improvement programme) is another important field of application.A general strategy to solve the non-perturbative renormalization problem in lattice QCD, using finite-size techniques and numerical simulations, is described. As an illustration we discuss the computation of the axial current normalization constant, the running coupling at zero quark masses and the scale evolution of the renormalized axial density. The non-perturbative calculation of O(a) correction terms (as they appear in Symanzik's improvement programme) is another important field of application.A general strategy to solve the non-perturbative renormalization problem in lattice QCD, using finite-size techniques and numerical simulations, is described. As an illustration we discuss the computation of the axial current normalization constant, the running coupling at zero quark masses and the scale evolution of the renormalized axial density. The non-perturbative calculation of O(a) correction terms (as they appear in Symanzik's improvement programme) is another important field of application.A general strategy to solve the non-perturbative renormalization problem in lattice QCD, using finite-size techniques and numerical simulations, is described. As an illustration we discuss the computation of the axial current normalization constant, the running coupling at zero quark masses and the scale evolution of the renormalized axial density. The non-perturbative calculation of O(a) correction terms (as they appear in Symanzik's improvement programme) is another important field of application.A general strategy to solve the non-perturbative renormalization problem in lattice QCD, using finite-size techniques and numerical simulations, is described. As an illustration we discuss the computation of the axial current normalization constant, the running coupling at zero quark masses and the scale evolution of the renormalized axial density. The non-perturbative calculation of O( a ) correction terms (as they appear in Symanzik's improvement programme) is another important field of application.hep-lat/9512009DESY-95-230CERN-TH-95-327MPI-PHT-95-124CERN-TH-95-327DESY-95-230MPI-PHT-95-124oai:cds.cern.ch:2925541995-12-05 |
| spellingShingle | Particle Physics - Lattice Jansen, Karl Liu, Chuan Luscher, Martin Simma, Hubert Sint, Stefan Sommer, Rainer Weisz, Peter Wolff, Ulli Non-perturbative renormalization of lattice QCD at all scales |
| title | Non-perturbative renormalization of lattice QCD at all scales |
| title_full | Non-perturbative renormalization of lattice QCD at all scales |
| title_fullStr | Non-perturbative renormalization of lattice QCD at all scales |
| title_full_unstemmed | Non-perturbative renormalization of lattice QCD at all scales |
| title_short | Non-perturbative renormalization of lattice QCD at all scales |
| title_sort | non-perturbative renormalization of lattice qcd at all scales |
| topic | Particle Physics - Lattice |
| url | https://dx.doi.org/10.1016/0370-2693(96)00075-5 http://cds.cern.ch/record/292554 |
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